An Efficient Direct Solver for Separable and Non-Separable Elliptic Equations.
Abstract
The basic error vector propagation method (EVP) for the solution of elliptic equations is described. It's advantages and limitations are compared to other direct solvers and iterative methods. A new technique called stabilized error vector propagation (SEVP) is presented. This method has most of the advantages of the EVP algorithm and, in addition, it is stable for all grid sizes. By solving Poisson's equation with Dirichlet boundary conditions, SEVP is found to be 3 to 10 times faster than competative direct methods on a vector computer and requires an order of magnitude smaller computer memory. SEVP is at least 10 times faster than SOR. The efficiency of the SEVP method is found to increase for grids stretched in the marching direction while other methods tend to deteriorate under similar conditions. (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Mar 01, 1978
- Accession Number
- ADA056360
Entities
People
- Rangarao V. Madala
Organizations
- United States Naval Research Laboratory